Enumerating coprime permutations
Abstract
Define a permutation σ to be coprime if (m,σ(m)) = 1 for m∈[n]. In this note, proving a recent conjecture of Pomerance, we prove that the number of coprime permutations on [n] is n!· (c+o(1))n where \[c = Πp prime (p-1)2(1-1/p)p· (p-2)(1-2/p).\] The techniques involve entropy maximization for the upper bound, and a mixture of number-theoretic bounds, permanent estimates, and the absorbing method for the lower bound.
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